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Classical Relaxation Phenomenology

  • Ian M.¬†Hodge

Table of contents

  1. Front Matter
    Pages i-xvii
  2. Mathematics

    1. Front Matter
      Pages 1-1
    2. Ian M. Hodge
      Pages 3-23
    3. Ian M. Hodge
      Pages 25-47
    4. Ian M. Hodge
      Pages 49-69
    5. Ian M. Hodge
      Pages 71-80
    6. Ian M. Hodge
      Pages 81-107
  3. Electrical Relaxation

    1. Front Matter
      Pages 109-109
    2. Ian M. Hodge
      Pages 111-137
    3. Ian M. Hodge
      Pages 139-151
    4. Ian M. Hodge
      Pages 153-158
    5. Ian M. Hodge
      Pages 159-178
  4. Structural Relaxation

    1. Front Matter
      Pages 179-179
    2. Ian M. Hodge
      Pages 181-195
    3. Ian M. Hodge
      Pages 197-222
  5. Back Matter
    Pages 223-256

About this book

Introduction

This book serves as a self-contained reference source for engineers, materials scientists, and physicists with an interest in relaxation phenomena. It is made accessible to students and those new to the field by the inclusion of both elementary and advanced math techniques, as well as chapter opening summaries that cover relevant background information and enhance the book's pedagogical value. These summaries cover a wide gamut from elementary to advanced topics.

The book is divided into three parts. The opening part, on mathematics, presents the core techniques and approaches. Parts II and III then apply the mathematics to electrical relaxation and structural relaxation, respectively. Part II discusses relaxation of polarization at both constant electric field (dielectric relaxation) and constant displacement (conductivity relaxation), topics that are not often discussed together. Part III primarily discusses enthalpy relaxation of amorphous materials within and below the glass transition temperature range. It takes a practical approach inspired by applied mathematics in which detailed rigorous proofs are eschewed in favor of describing practical tools that are useful to scientists and engineers. Derivations are however given when these provide physical insight and/or connections to other material.

  • A self-contained reference on relaxation phenomena
  • Details both the mathematical basis and applications
  • For engineers, materials scientists, and physicists

Keywords

relaxation spectroscopy dielectric relaxation structural relaxation electrical relaxation mathematics of relaxation constant displacement conductivity relaxation enthalpy relaxation

Authors and affiliations

  • Ian M.¬†Hodge
    • 1
  1. 1.School of Physics and Astronomy (retired)Rochester Institute of TechnologyRochesterUSA

Bibliographic information